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See figure below. Round answer to the nearest tenth of a degree

See figure below. Round answer to the nearest tenth of a degree-example-1
User BevansDesign
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1 Answer

23 votes
23 votes

ANSWER


\begin{equation*} 109.2\degree \end{equation*}

Step-by-step explanation

We want to find the measure of angle B.

To do this, we first have to find the measure of angle C using the sine rule:


(\sin C)/(AB)=(\sin A)/(BC)

Substitute the given values into the equation and solve for C:


\begin{gathered} \sin C=(AB*\sin A)/(BC) \\ \\ \sin C=(180*\sin42)/(250) \\ \\ \sin C=(120.4435)/(250)=0.4818 \\ \\ C=\sin^(-1)(0.4818) \\ \\ C=28.8\degree \end{gathered}

Now, we can find the measure of angle B using the sum of angles in a triangle. The sim of angles in a triangle is 180 degrees. This implies that:

[tex]\begin{gathered} That is the measure of angle B.
User PsychoFish
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